Automated placental measurement

ABSTRACT

A method for analyzing the placenta and histology slides of placental tissue comprising: selecting a placental sample to be analyzed; obtaining a digital image of the placental sample; and performing an analysis on the digital image, wherein a mathematical algorithm is applied to the digital image. The results of the analysis are correlated with data on health outcomes in infants, children, or adults and are used to assess future physiological risks to a patient.

STATEMENT REGARDING FEDERALLY SPONSORED RESEARCH OR DEVELOPMENT

This invention was made in part with Government support under National Institutes of Mental Health Grant No. 1K23MH067857-01. The Government has certain rights in the invention.

CROSS-REFERENCE TO RELATED APPLICATIONS

Not applicable.

INCORPORATION-BY-REFERENCE OF MATERIAL SUBMITTED ON A COMPACT DISC

Not Applicable.

FIELD OF THE INVENTION

The present invention generally relates automated imaging measures of the intrauterine environment through placental photography and histology.

BACKGROUND

The placenta, the key organ upon which the fetus is entirely dependent for all oxygen and nutrition, grows in a branching fashion analogous to the growth of a tree and its branches. The major villous types, their principal time periods of development during gestation, and their specific physiology have been well delineated in the research setting. But routine pathology slide review has poor reliability in distinguishing the major patterns of placental branching morphogenesis. As the evidence that lifelong health risks appear to be correlated with birthweight, the importance of placental growth and development as the principal non-genetic contributor to fetal growth has grown.

The placenta is the only fetal organ that can be dissected in a living child to yield information related to cell proliferation (a marker of tissue health), branching (reflecting gene transcription events) and cell death.

Placental vascular growth, essential to healthy fetal life, is too complex to be reliably estimated even by specialists. Indeed, pathologists often make unreliable diagnoses of histology features that are recognized to be associated with long term health risks.

A reliable and automated assessment tool performed on routine stained placental slides may help understand how intrauterine stressors modulate placental (and by extension fetal) well-being.

Thus, there exists the need for an automated, reliable, and inexpensive method of measurement of placental vascular growth through placental imaging and histology.

SUMMARY

Disclosed herein is a new approach towards automated measures of the intrauterine environment through placental imaging and histology.

Other objects and features will be in part apparent and in part pointed out hereinafter.

BRIEF DESCRIPTION OF THE DRAWINGS

Those of skill in the art will understand that the drawings, described below, are for illustrative purposes only. The drawings are not intended to limit the scope of the present teachings in any way.

FIG. 1 is a pair of before and after images of placental tissue processed by a spatial fuzzy c-means algorithm (SFCM algorithm). In this application of the algorithm the parts of the image that show the neutrophils have been extracted.

FIG. 2 is a pair of before and after images of placental tissue processed by a spatial fuzzy c-means algorithm (SFCM algorithm). In this application of the algorithm the parts of the image that show an edema of the connective tissue have been extracted.

FIG. 3 is a pair of before and after images of placental tissue processed by a spatial fuzzy c-means algorithm (SFCM algorithm). In this application of the algorithm the parts of the image that show views of the connective tissue have been extracted.

FIG. 4A is a photograph of a digitized histology slide. FIG. 4B is the image processed by the ECognition software showing the extracted objects

FIG. 5 shows the image from FIG. 4B correlated with the biological schema.

FIG. 6 is a series of photomicrographs depicting selected photomicrographs from cases with extreme low (negative) and high (positive) factor scores.

FIG. 7 is a photograph of a placenta sliced in 8ths, and the corresponding traced sliced perimeters

FIG. 8 is a digitized photograph of the placental chorionic surface marked for mbilical cord insertion, the disk perimeter (outer marking), and terminal points of chorionic vascular plate branches (inner marking). The ratio of these areas is associated with decreased observed/expected birth weight.

FIG. 9 is a series of histograms of mean REGR factor score 3, 4, 6, and 7, for term and preterm birth.

FIG. 10 is a series of histograms of mean REGR factor score 3, 6, 7, and 12 for preterm cases categorized as having chorioamnionitis (‘1’) and not having chorioamnionitis (‘0’).

FIG. 11 is a series of schemas depicting determination of chorionic plate area and centroid, chorionic vascular area and centroid, and discordance or concordance of centroids.

FIG. 12 is a series of histograms depicting the distribution of baby weight (12A), placental weight (12B) and inter-centroid distance normalized to chorionic plate area (12C).

DETAILED DESCRIPTION OF THE INVENTION

The methods described herein teach a process for extracting medically significant information from digital images of placental tissue by processing the image through a mathematical algorithm. The medically significant information extracted from the image may, for example, count neutrophils that are responses to bacterial infection. High neutrophil counts indicate a bacterial infection was present in the fetal environment before birth. Such bacterial infections are one of the most significant predictors of risk for Cerebral Palsy (CP) in term infants. Cerebral Palsy is not diagnosed until several years after birth; CP cannot be identified by examination of the mother or the newborn, but identification of the risk of CP by the methods taught herein can enable a phyisician to prescribe a plan of monitoring and early intervention if signs of the disease begin to manifest themselves. An example of the extraction of neutrophil information is discussed further in Example 1

Another example of medically significant information that can be extracted from digital images is a measure of the integrity of the connective tissue. As a result of bacterial or viral infections, these connective tissues may be damaged by digestive enzymes released by the neutrophils recruited to attack the invader. These same enzymes can damage the connective tissues of the fetus and lead to brain and lung damage in the child. As with CP, this damage may not be observable in the newborn, but the information produced by these methods for analysis of the placenta may allow a physician to prescribe early monitoring, intervention, or treatment for the infant and child. Furthermore, medically significant information can extracted from digital images of placental histological features so as to provide analysis of congenital viral infection (well recognized as a precursor to fetal anomalies as well as poor long-term neurological development), and maternal/uteroplacental and fetal-placental vascular pathologies (both of which are associated with fetal hypoxia and risk for poor long-term neurological development).

The first step of these methods is the selection of the placental sample to be analyzed. Every baby is born with a placenta and the sample may be taken from the placenta, the umbilical cord, or the membranes. The sample may be the entire placenta, the gross placental shape, portions of the placenta, umbilical cord, or membranes, or may be a slice of tissue from any of these fixed to a histology slide. The samples may be taken soon after birth, or the placental tissues may be preserved in formalin and the digital images may be taken at a later date, even years later. Measurements taken at birth can be used to predict risk to future pregnancies born to that mother, as well as risks to the particular child.

A digital image of the placental sample may be obtained using a film or digital camera, using a microscope with a camera attachment, or using a slide digitizer. Film images may be digitized if they are of sufficient resolution. For obtaining a digital image of the entire placenta, the preferred method is to use a digital camera. For obtaining a digital image of histology slides, the preferred method is to use a slide digitizer such as an Aperio T3, manufactured by Aperio Technologies Corp. in Vista, Calif. Other slide digitizers may be used such as those manufactured by Nikon, Zeiss, or Leica. The digital images of histology slides should have sufficient resolution to allow extraction of image features up to a magnification of 20-40×.

The digital images are analysed by processing them by a mathematical algorithm. Several types of algorithms may be employed alone or in combination to extract the features of interest from the image. Among the algorithms that can be used are spatial fuzzy c-means algorithms, segmentation algorithms, boundary finding algorithms, counting algorithms, length measuring algorithms, branching algorithms, angle measuring algorithms, and color discriminating algorithms. Other types of algorithms useful for image analysis or segmentation are clustering (K-means) algorithms, mean shift algorithms, histogram-based algorithms, edge detection algorithms, region growing algorithms, level setting algorithms, graph partitioning algorithms, watershed transformation algorithms, model based segmentation algorithms, multiscale segmentation algorithms, semi-automatics segmentation algorithms, and neural network algorithms. For example, a branching algorithm may be used to extract the extent of branching of the major placental blood vessels from the digital image of the chorionic surface of the entire placenta. A color discriminating algorithm may be used to extract the neutrophils from a digital image of a histology slide and then a counting algorithm used to count the number of neutrophils present.

These mathematical algorithms analyse the image by the application of mathematical rules. For example, one particularly useful algorithm is the spatial fuzzy c-means (SFCM) algorithm. The unsupervised cluster algorithm, called SFCM (Spatial Fuzzy c-Means), is based on a fuzzy clustering c-means method that searches the best fuzzy partition of the universe assuming that the evaluation of each object with respect to some features is unknown, but knowing that it belongs to circular regions of R 2 space. The spatial function is the summation of the membership function in the neighborhood of each pixel under consideration. The advantages of the SFCM are the following: (1) it yields regions more homogeneous than those of other methods, (2) it reduces the spurious blobs, (3) it removes noisy spots, and (4) it is less sensitive to noise than other techniques. This technique is a powerful method for noisy image segmentation and works for both single and multiple-feature data with spatial information.

The features of interest include neutrophils, connective tissues, portions of edema, cell nuclei, major blood vessels, branched villi, large villi, long villi, small villi, nutrition exchange vessels, and capillaries, markers of fetal hypoxia such as syncytial knots and syncytial basophilia, villous fibrosis/scarring, chronic villitis and chronic intervillositis, infarcts, abruption, perivillous fibrin deposition and cytotrophoblast proliferation, abnormalities of clotting and inflammation in the basal plate and maternal uteroplacental vessels, cell death of epithelia, stroma, endothelia, proliferation of macrophages and fibroblasts in connective tissue and stroma, abnormalities of clotting and inflammation in the fetal-placental blood vessels.

After extracting the feature of interest from the digital image measurements of those features may be made and statistics of those parameters may be calculated. In one example noted above the neutrophils can be extracted and then counted. Similarly, syncytial knots may also be extracted and counted. The major blood vessels may be extracted and their lengths and areas measured with statistics such as minimum, maximum, and mean computed.

Obtaining the digital image, analyzing the image, extracting the features of interest, applying the algorithm or algorithms, and computing relevant statistics may be automated by computer scripts or macros. The physician or pathologist may be able to insert a slide in a slide digitizer and via an interface select features of interest or regions of interest on the image and the computer scripts will perform the requested analysis and report the relevant measurements or statistics in an automated operation. It is contemplated within the scope of this invention that these scripts may allow a slide to be inserted into the slide digitizer and the computer will look for any evidence of abnormality or disease in a completely automated operation without prior physician input.

Statistics derived from the digital image are correlated with known health risks and outcomes. High numbers of neutrophils are known to be related to risk of Cerebral Palsy. Vascular edema is related to brain damage. Lack of integrity of connective tissue is related brain, lung, and heart damage. Additional published studies relate the health and development of placental tissues to the long term health—or health risks—of children and adults.

Reliable measures of placental tissues as taught by the methods described herein enable physicians to more accurately assess future health risks, risks to future pregnancies of that mother, and to prescribe monitoring, intervention, and treatment at an earlier time and to greater effect of her current child. Thus is provided an approach for an automated and method of placental diagnosis that includes a completely novel measurement of placental vascular branching structure and more comprehensive and reliable histopathology diagnoses that can be performed on a routine hematoxylin and eosin stained slide obtained from, for example, the placenta at birth. This measure can improve diagnosis of fetal growth restriction, identify critical periods of abnormal placental growth that might mark risks for later health risks, and reliably diagnose placental histopathology features that have been associated with increased long term neurodevelopment risks but which remain unreliably diagnosed by routine pathology. The measure is comprehensive, including both measures of the whole placenta and visible features of the chorionic surface vasculature with measures of the fine (microscopic) placental structure. Further, the measurement is automated, incorporating into its algorithms the full field of knowledge of placental structure, pathology, and functional correlates. The reliability of the method and the ease of preparation of a routine stained slide, makes its application practical on a wide population basis. As such, the diagnoses generated by these measurement tools would be accessible to all newborns. Such tools could impact public health burdens as obesity and diabetes, cardiovascular disease, certain cancers, and psychological disorders, disorders that have their genesis, at least in part, in fetal life.

Image Segmentation: Gross Placental Features

Image segmentation methods are described herein to be applied to the gross features of the placenta and to histology slides taken from placental tissues. The prior art method for measuring the whole placenta involves describing whether the placenta is round/oval or more irregular, noting whether more than one placental lobe is present, and taking a single measurement of larger and smaller diameters, and a single measure of the placental disc thickness. This method may be used in capturing the shape of regular, round/oval placentas, but is unreliable in regards to the irregular placental shapes that are commonly considered to reflect the effects of the most problematic maternal/uteroplacental environments and the formations of normal placental growth patterns. We have demonstrated, using the publicly available data collected as part of the Collaborative Perinatal Project, that abnormal placental shape has a persistent negative effect on birthweight after adjustment for placental weight and other placental dimensions. Thus, given to placentas, each weighing 500 g, the placenta with the irregular shape will yield a statistically significantly smaller baby than a round/oval placenta. This means that abnormal placental shape is not compensated for by further placental growth. Furthermore, abnormal placental growth affects the three-quarter scaling of placental growth to fetal growth, indicating that these abnormal shapes reflect abnormal placental vascular fractal networks. While most normal placentas (placentas delivered with infants who are well grown at term and not admitted to the neonatal intensive care unit) will have a uniform thickness, many placentas have variable thickness which is well recognized to reflect variable arborization of the placental villous trees. It is generally held that such variability in villous arborization reflects maternal uteroplacental pathology. However, current surgical diagnostic methods do not capture variability in disc thickness, and current research methods cannot allow such variability to be analyzed.

We described that more precise measurement of placental perimeters increases the total amount of birthweight variants attributable to placental factors. However, this measurement method required a trained technician applying costly software, and could not be used on a population basis. Our current methods involved the simple tracing of the placental perimeter, noting appropriate landmarks (such as umbilical cord insertion and the edge of the placenta closest to the free edge of the ruptured membranes) with a drawing tool in Adobe Photoshop. Use-specific algorithms written in MatLab code extract a series of quantities that reflect the area, eccentricity, and regularity of the shape. We have applied the same method to marking the vascular parameter of the chorionic disc, to furthest-most extensions of the chorionic surface vessels on the plate. A similar use-specific algorithm calculates a series of quantities, and the two sets of quantities are used to calculate the eccentricities, among other features, of the two shapes. The placental disc is fixed in formalin and subsequently sliced in eighths, and the seven unique surfaces are digitally photographed. Again the drawing tool in Adobe Photoshop is sufficient to extract slice perimeters. These slices are used to add n “height function” to the surface information, in essence re-creating the three-dimensional placental shape. The combination of data from the chorionic surface and disc thickness reflecting the height of villous arborizations are used to calculate the “inverse solution”, namely, a mathematical distribution of the maternal environment that created the particular combination of chorionic plate shape, chorionic vascular growth, and villous arborization patterns.

Chorionic surface vascular branching is laid down by the middle of the second trimester, and the principal branches off the umbilical cord insertion reflect the state of the primordial placenta shortly after the onset of the beating fetal heart. As such, the number of such vessels, the number of branch points, inter-branching intervals, and the total vascular length are measured to quantify aspects of endothelial proliferation and gene events relevant to placental branching early in gestation. At the same to early gestational ages, fetal viscera such as lung, kidney, and pancreas are also using the same gene families, and the same molecular signals and cascades to induce growth and branching growth. Using an image de-noising method and the graphic tool of Adobe Photoshop, the chorionic surface vessels can be reliably traced, the resultant network extracted, and analyzed by use-specific algorithms for initial number of branches and branching density at intervals of the radius out from the umbilical cord. Another embodiment takes the digital image of the chorionic surface vessels traced on the placental image. A distance measuring algorithm finds the distance from each pixel of the image to the nearest blood vessel. That metric is correlated with birth weight.

Image Segmentation: Histologic Placental Features—Current Diagnostic Types (Acute Inflammation, Chronic Inflammation and Vascular Pathology)

While histopathologic identification of specific features is the prior art method for diagnosis of inflammation and hypoxia, the diagnosis of these processes, each with well-characterized fetal, neonatal and potentially lifelong impacts, remains problematic. Interobserver reliability, even with a test set of 20 slides, 14 of which had lesions, yielded reliability coefficients that were primarily only “fair”. Furthermore, “consensus” was the gold standard, not a specific maternal, fetal or neonatal outcome, nor was an objective morphometric quantification provided for such items as “neutrophil count” or “syncytial knotting”. The digitization of images and, more recently, entire histology slides, has moved each of these into the realm of “data”, accessible (as pixels) to mathematical manipulation.

In one embodiment, image segmentation is directed toward the identification of “objects” that can be organized into networked structures of linked objects, which may carry various kinds of data (including physiologic/functional). Images are segmented according to pixel characteristics. There can be many possible partitions of the domain of an image into subsets among them are coherence of brightness, color, texture, or motion. The objective is to use the low-level coherence of brightness, color, texture, or motion attributes to sequentially come up with hierarchical partitions. Such hierarchical partitioning returns a tree structure instead of a single “flat” partition. One of several computational approaches is based on concepts from spectral graph theory. The modeling of the extracted quantities can be informed by mid- or high level knowledge about symmetries of objects or object models, and physiologic attributes of the measured structures.

Data are extracted from segmented images by straightforward algorithms but are modeled based on a priori understanding of the underlying structure or data organization. Modeling, rather than the image analysis itself, is used to construct “objects” such as villi or specific histology items from the concrete image. Once created, “semantic meanings” can be assigned and the objects (or “latent variables, in modeling parlance) ordered into a hierarchical input object structure, importantly again, incorporating a priori knowledge of the biological system. This approach has been suggested to have the relational flexibility of nonlinear methods such as functional data analysis plus the ability to organize relationships within a hierarchical structure that is biologically based.

Stained histology slides of placental tissue produce images with highly concentrated color spectra, making these images strong candidates for the use of automatic image segmentation and object classification algorithms.

In order to improve algorithm reliability but to retain the lack of bias inherent in an automated analysis system, the procedure is operationalized as follows:

The digitized slide is opened. The specific algorithm/algorithms sets are specified. The interface runs a “Specify ROI” sub-routine which selects regions of interest (ROI) from the whole slide at random and presents them to the technician/pathologist for review. ROI's can be accepted all or in part, and rejected (all or in part) due to malposition (ROI located off the tissue image), technical artifact (knife blade artifact, folding, staining irregularities), or appropriateness (e.g., algorithms for diagnosis of acute intraamniotic infection are applied to the chorionic plate in a tissue slide, but not to the chorionic villi). ROI's are presented until a set area is reached; algorithms are then run and data exported.

Image Segmentation: Villous Branching Structure

While at least some methods for histopathologic identification of inflammation and hypoxia exist, the prior art has no standard method for the analysis of placental branching architecture. Advanced mathematical techniques are well suited for the quantitative analysis of placental branching architecture, and the quantities so extracted can be entered into models to study their contributions to causal pathways of fetal disease. However, placental arborized structure, as measured after delivery, reflects the effects of the underlying maternal uteroplacental environment. That environment is not directly observable (hence “latent”) but it causes the observed placental arborized structure. Empirically, then, measures of placental arborized structure and the maternal uteroplacental environment should be correlated, and the relationships among a set(s) of measured histological parameters related to placental arborized structure can be examined. Examples of histological parameters include, but are not limited to, villous numbers, villous areas, villous perimeters, trophoblast features including thickness, vascular features including medial characteristics, luminal perimeter and location within the villus (central versus subjacent to the trophoblast epithelium).

Further examples of histological parameters include, but are not limited to, syncytial knots (e.g., dark blue cluster of round objects); perivillious fibrin/fibrinoid (e.g., pink and devoid of nuclei the size of normal villous Syncytiotrophoblast, stroma and endothelial cells); cytotrophoblast proliferation (useful, for example, to distinguish “old” PVF from recent PVF; e.g., nuclei of the size of cytotrophoblast cells which should be distinct from villous stromal and other nuclei, found in PVF); and stromal cellularity (e.g., nuclear number within each distinct villus or maybe better nuclear area per villous area). Such histopathology parameters can be detected in, for example, H&E slides. Still further examples of histological parameters include, but are not limited to, syncytiotrophoblast; endothelium (useful, for example, to verify H&E stained algorithms); macrophages (e.g., 40-60% of villous stromal cells are immunocompetent macrophages); and anchoring and endovascular trophoblast (useful, for example, to shifts focus from villous arborization to the placental remodeling of the implantation site, which moves analysis into earlier times of gestation, and ultrasonographic correlation). Such histopathology parameters can be detected in, for example, immunohistochemical (IHC) stained slides. [What about cell proliferation and/or cell death markers/]

Generally, analysis includes definition objects (e.g., discrete histological factors). The objects can be obtained from an image (e.g., an image of a histological slide from a placenta). Such image is segmented, and each segment is classified according to size (see e.g., Examples 1-3). The classification parameters are combined in linear combinations so as to form factors (see e.g., Example 4). Usually, the parameters will relate to various placental structures and/or cell types. Analysis includes determination of the presence and number of the factors (“model object”). Analysis also includes determination of relationships and patterns among the factors (“neighborhood”). Useful to the methods described herein is any software package that incorporates these specific types of analytical tools. Examples of software approaches include factor analysis (FA) (e.g., exploratory and/or confirmatory factor analysis) and cognition networks (see infra, data reduction).

The computational methods used in pattern recognition of objects are discussed in, for example, U.S. Pat. No. 6,091,852; U.S. Pat. No. 6,229,920; WO0171577; WO0063788; EP0863485; EP0858051; EP0846306; EP0843864; and EP0870275, each of which are specifically incorporated by reference in their entirety. Examples of software packages useful to the present invention include, but are not limited to, ECognition (Definiens, Munich, Germany) and Biomarker AMplification Filter (BAMF) (Vacaville, Calif.).

The methods described herein can be employed to reliably diagnose placental villous branching patterns that, to date, cannot be reliably diagnosed including, but not limited to, the 6 paradigm branching patterns as elaborated by Kaufmann (Normal preterm placenta (defined as prevalence of immature intermediate and mesenchymal villi, complete absence of mature intermediate and terminal villi, poorly matured stem villi), Immature placenta at term (defined as prevalence of mature intermediate and stem villi, paucity of immature intermediate and terminal villi), Normal term placenta (defined as a generally even distribution of all types of villi), Preterm preeclampsia (the pathology classic for maternal vascular pathology, defined as poorly branched, extremely tiny, filiform terminal villi and because of paucity of terminal branching, an unusually wide intervillous space), Term preeclampsia (defined as a generally even distribution of all types of villi, with terminal villi generally being enlarged and highly branched), and two cases of malformed villi with normal numerical mixture of villous types).

The methods described herein can also be employed, for example, to: diagnose time of onset of placental pathology (through “branching tree” analysis); quantify the effect of abnormal placental growth on the fetus (by, for example, assigning physiological quantities to a cognition network); reliably diagnose fetal growth restriction including abnormal growth within the “normal” birth weight range; diagnose which cases of maternal diseases (such as diabetes, preeclampsia) affect the growth of the placenta and/or growth of the baby and which do not; document treatment efficacy and treatment failure in patients treated in a subsequent pregnancy after a pregnancy loss or serious complication; and diagnose which pregnancies following IVF/ART have abnormal placental growth and which do not.

Abnormal placental branching could be associated with childhood (and potentially lifelong) abnormal function of organs that are undergoing branching growth at the same time as the placenta. Thus, the methods described herein can also be employed to diagnose risk for abnormal neurodevelopmental outcome (analysis of neuron branching growth); risk of insulin resistance and abnormal glucose metabolism, obesity and diabetes (analysis of pancreatic branching growth); hypertension (analysis of branching growth of the cardiovascular system); reduced renal reserve/ risk of hypertension, renal dysfunction (analysis of kidney branching growth).

Furthermore, by building language algorithms for identifying pathology lesions that are currently recognized correlates with maternal and fetal/neonatal pathologies, one can provide an automated and reliable diagnostic service to a field with few dedicated practitioners and with a large need for such services (e.g., community hospitals, academic centers without a dedicated practitioner, in medicolegal field/risk management with “competing experts”) such as histology features that diagnose, for example, acute intraamniotic infections, chronic placental inflammation, maternal uteroplacental vascular pathology and fetal-placental vascular pathology. Thus is provided methods to diagnose the mechanistic cause and the time of onset of pathologies that create ill newborns or stillborn fetuses. More generally, the methods described herein allow identification of the time of onset of the histology features described herein and quantify their total effect on the fetus (via their effects on placental growth globally).

Registration and Reconstruction of Branching Architecture

Histology slides are two-dimensional slices from a three-dimensional placental volume. Image registration is the process of transforming the different sets of data into one coordinate system. Registration is necessary in order to be able to compare or integrate the data obtained from different measurements. Using image registration many slices can be combined to form a sub-volume of the three-dimensional structure. Two powerful registration methods can be combined in placental registration: Area based image registration algorithms and related methodology look at the structure of the image via correlation metrics, Fourier properties and other means of structural analysis; feature based methods, instead of looking at the overall structure of images, map to image features: lines, curves, points, line intersections, boundaries, etc. Combining segmentation techniques with registration, parts of the villous tree internal to the placental volume may be extracted and studied. Using these methods to segment histology images as well as images of the chorionic surface produces the geometric structure of several parts of the placental villous tree.

Very simple morphological methods can be applied to skeletonize the geometry and construct a representation of the tree as an embedded (i.e. geometric) graph. Graph theoretic techniques are applicable to analyzing the anatomical structure of the villous tree. Metrics can be designed from both the geometry and topology of the villous tree. For example, topological metrics count how many leaves are on each tree or how many levels of branching there are at each leaf, while geometric metrics examine how far traveling between two points in the tree compares to traveling in a straight line across the chorionic plate Additionally combined metrics, i.e. metrics that consider both the geometry and topology of the tree, can be used. One example is to measure the length between branch points at each level of branching. During the skeletonization process, some information may be lost (such as the thickness of the vessels), but some of this information can be retained by assigning weights to the edges of the constructed graph and viewing the resulting structure as a flow network or as a self-organizing map, a method that has been useful in dimension reduction.

Validation of Placental Measures and Models: Placental Function Depends on Placental Architecture.

Another embodiment described herein are based at least in part upon application of the discovery that placental growth scales to fetal growth to the three-quarter power, essentially consistent with scaling typical of fractal transport networks, and that altered placental shapes have scaling factors that deviate from the three-quarter rule, consistent with altered placental shapes reflecting altered underlying placental vascular fractal networks.

Modeling placental function and growth are accomplished separately. As stated above the primary function of the placenta is maternal-fetal transfer, therefore models of the vascular tree can be produced that optimize the transport function. Data analysis tools are then applied to compare specific villous trees with trees generated by this model to determine how far the given placental tree is from the “optimal” tree.

Optimal transport can be used to validate our measurement methods; in other words, the villous (and by extension, the underlying vascular) architectures we reconstruct are directly related to the estimated transport function of the placenta. Diffusion limited aggregation (DLA) is a stochastic process that can be applied to dynamically model angiogenesis in the placenta, thereby modeling placental growth. DLA has been used to model retinal and tumor angiogenesis. Dynamic models of placental growth can be used to investigate the effect that environmental changes at different stages of the growth cycle have on the resulting vascular structure. DLA may be particular useful in maintaining a reasonably good agreement between the observed scaling exponent, approximately 0.75, which we have found to be appropriate for describing the relationship between placental structure and placental function.

Dynamical modeling of vascular trees is a new technique, developed by M. Yampolsky and his team at the University of Toronto. There have been prior art efforts to model the complex architecture of a vascular tree. They have been based on selecting certain geometric constraints for the tree, such as the number of branches at each vertex, and the branching ratios; and then optimizing the tree to fill the spatial shape of the organ. This approach is static in its nature, and does not give clues to the temporal development of the vasculature, and thus is not suitable for determining how growth pathologies affect the development of a placental vascular tree and the geometric shape of the placenta. The dynamical growth process in this invention is based on sprouting angiogenesis which is the mechanism of growth at the tips of the vessels. With each time increment, the model vascular tree is randomly grown at one of its extremities, with a single parameter controlling the density of the branching. This random growth process is known as DLA. Applying a “hit” to the parameter of the model at a specific moment of time we influence the development of a particular level of the vasculature.

The model successfully reproduces the variability of shapes of pathological placentas. Quantitatively, the deformations in the model trees will be described by the changes in the average number, length, and thickness of branches. This makes it possible to introduce measures of the deviation from the normal, and to search for markers corresponding to the specific changes in the vascular structure. Another approach to measuring the deviation from the normal relies on measuring the optimality of the branching architecture. Possible conditions of optimality reflect the efficiency with which the blood flow is delivered to the tissues. They translate into an optimal local geometry of the vascular tree. Under the assumption that a normal vasculature is close to optimal, the deviation from normal growth can be expected to induce a measurable decrease in optimality.

In summary, the tools we apply to placental measurement fully characterize the histopathology and the architecture of a fetal organ the growth of which depends upon pathways critical to the genesis of autism and other childhood and adult morbidity risks. Finally optimal transport analysis and DLA confirm that our measures and reconstructions are valid and relevant to placental function and fetal-placental physiology. [Comment: Do you need to be more specific about genesis of other diseases or is a blanket statement sufficient, e.g., childhood and adult morbidity risks?]

Data Reduction

Computer-assisted image analysis minimizes measurement error of individual histology items and while each item may be reliable, the complexity of placental arborized structure requires measuring so many histology items that data reduction is required before examination of the predictive effects of different patterns of placental arborized structure. Various strategies of data reduction can be employed.

In one embodiment factor analysis (FA) is an applicable method of data reduction. FA determines the number of underlying latent variables that fit the mathematical variance of a large number of observed items. But empirically derived factors may not be biologically relevant. Also, it can be difficult to choose between explaining greater data variance (with many factors) and accounting for less variance with a more readily interpretable model (with fewer factors). Trimming factors can be problematic as well. A factor marking a set of uncommon item values accounts for little variance, but may mark a physiologically significant process. Moreover, FA is vulnerable to small fluctuations in multi-dimensional data “space”; factor extractions are not infrequently poorly generalizable to other data. A large data set allows split-half analysis; a set of empiric factors is extracted by exploratory factor analysis (EFA) in one half of the data. In the other half, that factor structure is tested with confirmatory factor analysis (CFA), with the EFA-derived factor structure being explicitly specified.

Another embodiment is the use of cognition networks (CN) attempt to reduce data via building biologically driven hierarchies into what could be viewed as a more complicated and hierarchical factor structure. CN are network structures of linked objects, which may carry various kinds of data extracted from complex inputs such as images. Data are extracted by algorithms drawn from a priori understanding of the underlying structure or data organization (e.g., placental structure). Objects such as villi or specific histology items are constructed from the concrete data in the image. In the CN analytical software (e.g., ECognition, Definiens, Munich, Germany), “class” labels can describe semantic meaning of these concrete objects. The classes can form a structured subnetwork of model objects called the model network. In the beginning of the cognition process, the model network can create a separate hierarchical input object structure from the input data (like pixels or words). The model network and the objects linked into it are generally termed a “network situation”. This can be modified by user-specified “procedures” (algorithms) that can incorporate a priori knowledge of the biological system (e.g., placental structure and development) until a final network configuration is reached that represents the knowledge extracted from the input data. The final output can include object features, measured properties of individual image objects, means and ranges of properties for specific image object types, and parameters of network structure and object classification that represent higher levels of data organization. CN has the relational flexibility of nonlinear methods such as functional data analysis plus the ability to organize relationships within a hierarchical structure that is biologically based, and thus has application to the development of placental structure measurement tools.

EFA is generally exploratory and has few explicit assumptions but can be problematic to define and interpret. CFA allows explicit incorporation of knowledge but factors may be unstable between data sets. CN have features of CFA (e.g., relationships among objects are explicit) but allows for nonlinear relationships among objects, classes and groups. CN also add an explicit hierarchy or ordering of relationships that may be biologically more reasonable than the linear variable combinations that are EFA factors.

Reliability and Validity of Measures

While data might be reduced to a parsimonious set of factors, the factors may not reliably measure what they are intended to measure. In evaluating reliability of quantification of individual histology items and of the EFA/CFA factors, several reliability tests can be used. For example, multiple tissue samples from one placenta are multiple “tests” of that placental structure. As another example, “test-retest” reliability can assess reliability of histology item quantification and also the extent to which placental structure (reflected in factors as combinations of related histology item scores) is stable across multiple tissue “tests”.

The analysis methods may generate a large number of quantified variables relating to aspects of histology items, many of which are intercorrelated. When many potentially parallel histology items are present, histology items can be split in two to test “alternate forms” reliability. This approach can test whether items missing could be substituted with other items and the overall measures remain reliable. Such flexibility allows for tools to be robust to inevitable variability in tissue sampling techniques (that may result in missing histology items) when employed on large populations. Generalizability is the extent to which the measurement process is equivalent across dimensions. Potential sources of variation include, for example, gestational age at delivery, maternal disease states (e.g., preeclampsia, diabetes), and exposures (e.g., maternal smoking). Procedures described herein are sufficient to test whether the measures are consistent across strata.

To determine the associations between placental structure and childhood outcomes, structural equation modeling (SEM) can be employed. SEM explicitly models factors as mirrors of latent variables to test the relationships among factors, covariates and outcomes. MPlus (Muthen and Muthen, 2006) is an especially flexible SEM tool that accommodates categorical and continuous latent variables, and latent class analysis. SEM is a linear modeling approach and, as such, provides for modeling factors that are linear combinations of histology items. With CN data reduction, nonlinear methods such as functional adaptive model estimation (FAME) can model non-Gaussian responses with the ease of generalized linear models as well as nonlinear response surfaces, and can be applied to more functional data such as CN.

Having described the invention in detail, it will be apparent that modifications, variations, and equivalent embodiments are possible without departing from the scope of the invention defined in the appended claims. Furthermore, it should be appreciated that all examples in the present disclosure are provided as non-limiting examples.

REFERENCES CITED

All publications, patents, patent applications, and other references cited in this application are incorporated herein by reference in their entirety for all purposes to the same extent as if each individual publication, patent, patent application or other reference was specifically and individually indicated to be incorporated by reference in its entirety for all purposes. Citation of a reference herein shall not be construed as an admission that such is prior art to the present invention.

EXAMPLES

The following non-limiting examples are provided to further illustrate the present invention. It should be appreciated by those of skill in the art that the techniques disclosed in the examples that follow represent approaches the inventors have found function well in the practice of the invention, and thus can be considered to constitute examples of modes for its practice. However, those of skill in the art should, in light of the present disclosure, appreciate that many changes can be made in the specific embodiments that are disclosed and still obtain a like or similar result without departing from the spirit and scope of the invention. It shall be understood that any method described in an example may or may not have been actually performed, or any composition described in an example may or may not have been actually been formed, regardless of verb tense used.

Example 1 Extracting Neutrophils

A placental sample was taken from the placental membranes of a term fetus. A slice of the tissues was prepared using the standard procedure for preparing a histology slide. The tissue was fixed in formalin, de-hydrated, embedded in a paraffin block, a thin slice was microtomed from the block, and affixed to a glass slide. The slide was placed in an Aperio T3 slide digitizer and the image produced at a magnification of 20×. The digitized image was processed using the SFCM algorithm. The parameters of the algorithm were set to extract the color differences of the neutrophils. Both the original image and the extracted image are shown in FIG. 1. The extracted image separates the neutrophils from the remainder of the image. The high incidence of neutrophils indicates a higher risk that this child will develop Cerebral Palsy.

Example 2 Extracting Tissue Edema

A placental sample was taken from the umbilical cord of a term fetus. A slice of the tissues was prepared using the standard procedure for preparing a histology slide. The tissue was fixed in formalin, de-hydrated, embedded in a paraffin block, a thin slice was microtomed from the block, and affixed to a glass slide. The slide was placed in an Aperio T3 slide digitizer and the image produced at a magnification of 20×. The digitized image was processed using the SFCM algorithm. The parameters of the algorithm were set to extract the clear areas that characterize edema. Both the original image and the extracted image are shown in FIG. 2. The extracted image separates the areas of edema from the remainder of the image. The presence and extent of edema indicates an abnormal tissue function associated with poor neurodevelopmental outcome.

Example 3 Extracting Connective Tissue

A placental sample was taken from the placental membranes of a term fetus. A slice of the tissues was prepared using the standard procedure for preparing a histology slide. The tissue was fixed in formalin, de-hydrated, embedded in a paraffin block, a thin slice was microtomed from the block, and affixed to a glass slide. The slide was placed in an Aperio T3 slide digitizer and the image produced at a magnification of 20×. The digitized image was processed using the SFCM algorithm. The parameters of the algorithm were set to extract the grayscale intensity differences of the characterize connective tissues. Both the original image and the extracted image are shown in FIG. 3. The extracted image separates the connective tissues from the remainder of the image. The damage seen in the connective tissues of the fetal placenta reflects breakdown of those tissues from digestive enzymes which are associated with an increased risk of damage to the child's heart, lungs, and brain.

Example 4 Placental Shape as Reflective of Placental Function as a Fractal Network

Subjects were a subset of the National Collaborative Perinatal Project (NCPP). Details of the study have been described elsewhere [19, 20]. Briefly, from 1959 to 1965, women who attended prenatal care at 12 hospitals were invited to participate in the observational, prospective study. At entry, detailed demographic, socioeconomic and behavioral information was collected by in-person interview. A medical history, physical examination and blood sample were also obtained. In the following prenatal visits, women were repeatedly interviewed and physical findings were recorded. During labor and delivery, placental gross morphology was examined and samples were collected for histologic examination. The children were followed up to seven years of age. Placental gross measures included placental disk shape, relative centrality of the umbilical cord insertion, estimated chorionic plate area, disk eccentricity, placental disk thickness, placental weight, and umbilical cord length, measured according to a standard protocol. Gestational age was calculated based on the last menstrual period in rounded weeks. Among 41,970 women who gave the first or only singleton live birth, 36,017 contributed placenta data. The analytic sample was restricted to those with complete data on the six placental gross measures, placental weight and birth weight, of gestational ages>=34 weeks (younger infants having been unlikely to survive) and less than 43 completed weeks (given that gestations were assigned implausible gestational lengths up to 54 weeks, N=24,061). The original coding of placental measures and the recoding used for this analysis follow:

-   Chorionic disk shape coding was based on the gross examination of     the delivered placenta. Shapes included round-to-oval, and a variety     of atypical shapes (e.g., bipartite, tripartite, succenturiate,     membranous, crescent or “irregular”). Only 926 (3.8 percent) were     labeled as one of the 6 categories of shape other than     round-to-oval. For this analysis, the shape measure was recoded as a     binary variable with “round-to-oval” as “0” and “other than     round-to-oval” as “1”. -   Relative centrality of the umbilical cord insertion was calculated     from two variables recorded in the original data set. The distance     from the cord insertion to the closest placental margin was recorded     to the nearest cm. The type of umbilical cord insertion was coded as     membranous (velamentous), marginal or normal (inserted onto the     chorionic disk). We combined these two variables into a single     distance measure, by recoding velamentous cord insertions as a     negative value, cords inserted at the placental margin as “0” and     progressively more central cords as “1” to “9” (overall scale range     −13 to 13). -   Estimated chorionic plate area was calculated as the area of an     ellipse from two variables recorded in the original data set, the     larger diameter and smaller diameter of the chorionic disc were     recorded in cm. Disk eccentricity was calculated as the ratio of the     larger and smaller diameters. Both the chorionic plate area and disk     eccentricity could be cast as “interactions” between larger and     smaller disk diameters. -   Placental thickness at the center of the chorionic disc was recorded     in units of 0.1 cm, by piercing the disc with a knitting needle on     which millimeter marks were inscribed. -   Placental weight was measured in decagrams to the nearest 10 grams;     this variable was converted to grams. -   The fetoplacental weight ratio was calculated as birth weight     divided by the placental weight, and is a value generally considered     to reflect a physiologic state of balance between fetal and     placental growth. -   Umbilical cord length was analyzed as it was measured in the Labor     and Delivery Room. Cord lengths ranged from seven to 98 cm. -   Maternal characteristics were recorded at enrollment. Maternal age     was coded as age at (enrollment) in years, and maternal height was     measured in inches. Maternal weight prior to pregnancy was     self-reported in pounds. Body mass index (BMI) was calculated from     maternal height and weight. Parity counted all delivered live born     offspring and did not include miscarriages/early pregnancy losses.     Socioeconomic status index was a combined score for education,     occupation and family income as scaled by the US Bureau of the     Census. [21] Mother's race was coded as a binary variable denoting     African-American as “1” and all others as “0”; original data coded     race as Caucasian, African American, and “other”, most of whom were     Puerto Ricans (9.2 percent). Cigarette use was coded by maternal     self report at enrollment as non-smoker (coded as <1 cigarette per     day), or by the self-reported number of cigarettes smoked daily     grouped as 1-9, 10-20, and >20 (greater than one pack per day). -   The allosteric metabolic equation was solved for estimates of α and     β. Specifically, PW=α(BW)̂β is rewritten as a standard regression     equation and solved for α and β:

Log(PW)=Log α+β Log(BW)]  [Equation 1.1]

From Equation 1.1, Log α=Log(PW)−β[ Log(BW)]  [Equation 1.2];

Substituting the mean β for the population, this second equation was solved for each case, and the calculated Log α was exponentiated and used as a dependent variable in subsequent analyses: Spearman's rank correlations and multivariate regression were used to determine significant associations with P<0.05 was considered significant throughout. Three analyses were run. The first included all placental variables; thus the point-estimate of effect for each placental variable is adjusted for the presence of the others. The second included all maternal and fetal variables; again, data presented reflect effects adjusted for the presence of the other maternal variables. The third analysis included all variables (placental, maternal and fetal). Table 1 shows that the mean β was 0.78, ˜equal to the scaling of a fractal transport network.

TABLE 1 Descriptives of the placental measures (N = 24,061). Overall Population Mean (SD) Range α −0.25 (0.17) −1.23, 0.62 β   0.78 (0.02)   0.66, 0.89 Table 2 shows that each of the (crudely measured) placental dimensions altered the equation relating placental weight and birth weight.

TABLE 2 Placental, maternal and fetal influences on α Multivariate model- Multivariate model- Multivariate Placental variables Maternal and fetal model-All only variables only variables Variable (N = 24,061) (N = 21,603) (N = 21,603) Placental shape Round-oval  −0.021 (0.005) ***  −0.019 (0.005) *** (23,131) Other than round/oval (930) Chorionic plate area −0.001 (0.000) *

Disk ellipsivity

Larger diameter

Smaller diameter

Disc thickness

Cord length

Relative cord  0.014 (0.007) * 0.008 (0.007)  eccentricity Maternal age 0.000 (0.000)  −0.001 (0.000) ** Parity 0.000 (0.000)  0.001 (0.001) * Smoking

Infant gender

Birth length

Maternal BMI

Socioeconomic status 0.000 (0.001)

African-American 0.002 (0.003)

race Gestational age

*** P < 0.0001 bolded and italicized; ** P < 0.001; * P < 0.05; Not bolded, P > 0.05.

In a modern data set with our more sensitive and valid methods of measuring placental shape, we were more direct. Using the population α derived from the Collaborative Perinatal Project, we solved for β, and substracted the calculated β from the population β, and explored the relationships between “delta β” and the irregularity of the placental shape measured in 3 ways: 1. From the centroid of the placental shape (the mathematical center of the placenta, a physiologically arbitrary point); 2. From the site of umbilical cord insertion, the actual point of origin of the placental fractal vascular network; and 3. The roughness, calculated as the ratio of the perimeter to that of the smallest convex hull. Deviations from the ideal fractal scale were uncorrelated with the biologically arbitrary centroid, but were highly correlated with both the radial deviation from the umbilical cord insertion, and the roughness, a general measure of perimeter irregularity.

TABLE 3 Correlation of the deviation from a round shape with a deviation from the ¾ rule. beta3_4 Radial standard deviation Pearson Correlation .020 of the plate area from the centroid Significance .485 N 1199 Radial standard deviation Pearson Correlation −.076 of the plate area from the umbilical cord Significance .009 N 1187 Roughness = ratio of the Pearson Correlation .091 perimeter to that of the smallest convex hull Significance .002 N 1199 In another data set the blood vessels were traced on digital images of the placental chorionic surface. A distance measurement algorithm was applied to the image to determine the distance from each pixel to the nearest blood vessel. A metric was calculated using the mean distance divided by the placental diameter. Regression of that metric versus birth weight data showed that it accounted for 25% of birth weight variation.

Example 5 Seven Slides

A set of 7 slides considered paradigms for major types of placental growth included: Normal placenta at 31 weeks (defined as prevalence of immature intermediate and mesenchymal villi, absent mature intermediate and terminal villi, poorly matured stem villi), Immature placenta at term (defined as prevalence of mature intermediate and stem villi, paucity of immature intermediate and terminal villi), Normal term placenta (defined as an even distribution of all types of villi), Preterm preeclampsia at 31 weeks (defined as poorly branched, extremely tiny, filiform terminal villi and an unusually wide intervillous space due to reduced terminal branching,), Term preeclampsia (defined as a generally even distribution of all villus types), and two cases of malformed villi with normal numerical mixture of villous types). A minimal set of villous morphometric algorithms developed with ECognition software was applied to these 7 slides.

Slide Digitization: Slides were digitized using an Aperio T3 instrument that is a self-contained system for image capture, manipulation and management. This included tissue finding, auto-focusing, automated scanning, image compression and slide quality assessment. All relevant image capture parameters (e.g., file name, ScanScope ID, scan time, barcode, quality score, the directory path to the virtual slide image, etc.) are stored in a Virtual Slide Manager database (Aperio, Vista, Calif.). The slides were stored as JPEG compatible .svs files for optimal computational speed within the ECognition framework. FIG. 4A shows an unprocessed image obtained by the slide digitizer. FIG. 4B shows the same image after it was processed by the ECognition software. FIG. 5 shows the correlation of the image objects to their biological counterparts.

Results showed that villous histologic features were reduced to 13 variables related to villous size and/or villous capillary location. At least 2 and as many as 5 variables significantly distinguished the abnormal patterns from the paradigm normal pattern (p<0.05).

TABLE 1 Factor means comparing pathology types to “normal” Malformed at term Preterm/immature Immature/term Preterm preeclampsia Term preclampsia Factor 1 −0.08 v 0.15 −.021 v. 0.13  0.04 v. −0.90  0.15 v. −076 −0.13 v. 0.41 Factor 2 −0.26 v. 0.45 0.04 v. −0.27  0.0 v. −0.14 −0.14 v. 0.70  0.29 v. −0.96 Factor 3  0.23 v. −0.40 0.02 v. −0.11 0.02 v. −0.36 −0.04 v. 0.21 −0.22 v. 0.73 Factor 4 −0.15 v. 0.26 −0.04 v. 0.21  −0.02 v. 0.51   0.10 v. −0.50  0.05 v. −0.17 Factor 5 −0.05 v. 0.08 0.02 v. −0.14 0.00 v. −0.21  0.08 v. −0.41 −0.06 v. 0.21 Factor 6  0.09 v. −0.16 0.00 v. −0.01 0.01 v. −0.21 −0.10 v. 0.48  0.00 v. 0.00 Factor 7  0.04 v. −0.08 0.06 v. −0.34 0.00 v. −0.04 −0.03 v. 0.15 −0.06 v. 0.19 Factor 8  0.02 v. 0.04 0.02 v. −0.49 Factor 9 −0.20 v. 0.04 −0.20 v. 0.82 

In the 7 hematoxylin and eosin stained samples of placental villous branching morphogenesis types (paradigms for major types of placental growth), 80 variables were analyzed and reduced to 9 factors using principal components factor analysis (PCA) (see Table 1). The 6 paradigm patterns of abnormal placental villous branching were distinguishable from “term normal” by >1 factors, suggesting the present approach is tenable.

In the original test of 7 slides (see above), several variables could not be calculated; segmentation criteria were not robust to the full range of villous variability. Algorithms were revised and applied to 23 digitalized slides containing at least 1.5 MB of tissue data. 131 variables were calculated. Principal components analysis yielded 16 factors that together accounted for ˜88% of total data variance (see Table 2).

TABLE 2 PCA results showing 5 factors acount for ⅔ of data variance Initial Eigen values % of Cumulative Component Total Variance % Factor 1 40.584 36.56 36.56 Factor 2 11.518 10.38 46.94 Factor 3 9.296 8.38 55.31 Factor 4 7.386 6.65 61.97 Factor 5 4.954 4.46 66.43 Factor 6 4.293 3.87 70.30 Factor 7 3.601 3.24 73.54 Factor 8 3.190 2.87 76.42 Factor 9 2.700 2.43 78.85 Factor 10 1.841 1.66 80.51 Factor 11 1.709 1.54 82.05 Factor 12 1.551 1.40 83.45 Factor 13 1.457 1.31 84.76 Factor 14 1.251 1.13 85.89 Factor 15 1.172 1.06 86.94 Factor 16 1.114 1.00 87.95

Thus, automated assessment of placental villous branching growth is informative in clarifying placental pathology and by extension fetal pathophysiology.

Example 5 Microscopic Placental Measurement Tool

Using analytical software (ECognition, Definiens, Munich, Germany), a first set of villous algorithms were developed that were based on the histology items identified in a set of 10 digitalized histologically “normal” slides. Data were segmented into objects (villi) of different size ranges and into several specific histopathology items that pertain to discrete levels of the villous hierarchy, creating a simple set of “model objects”, the basic elements of the network language.

100 random hematoxylin and eosin stained (H&E) slides were digitized using an Aperio T3 instrument that is a self-contained system for image capture, manipulation and management. All relevant image capture parameters (e.g., file name, ScanScope ID, scan time, barcode, quality score, the directory path to the virtual slide image, etc.) was stored in a Virtual Slide Manager database (Aperio, Vista, Calif.). The slides were stored as JPEG compatible .svs files for optimal computational speed within the ECognition framework. 95 of the 100 were scanned at an image quality of at least 95% in a first run. In the other 5 slides, digitalization failed due to unusual placement of the tissue sample on the slide; adequate scanning was achieved in all of those cases after manual selection of the tissue frame.

Using ECognition software (Definiens, Munich, Germany), there was developed a preliminary set of villous algorithms based on histology items identified in a set of 10 slides from term placentas considered histologically “normal” and delivered at term of AGA liveborn, non-anomalous infants with normal fetoplacental weight ratios, and no diagnoses of diabetes or preeclampsia. The image was segmented into objects (villi, see e.g., FIG. 2) of different sizes and into specific histology items that pertain to discrete levels of the villous hierarchy (such as syncytial knots, vasculosyncytial membranes), creating a set of “model objects”, the basic elements of the network language. 78 aspects of these objects were quantified. Principal components analysis produced 7 factors that accounted for 48% of the total data variance. These algorithms were applied to 6 “gold standard” H&E slides of abnormal placental villous branching morphogenesis types (preterm preeclampsia, term preeclampsia, preterm, immature at term non-diabetic malformed, diabetic malformed). The 6 paradigms of abnormal placental villous branching were distinguishable from “term normal” by at least one (immature term vs. normal term) and up to 5 factors (preterm preeclampsia v. normal term).

The modified algorithms were applied to a set of 24 slides (drawn from the population reported in Salafia et al, AJE 2005) representing a range of birth weights from 800-4300 g, and gestational ages 24-41 weeks. 131 variables were quantified and reduced into 16 principal component factors that accounted for 88% of data variance (see Table 3). Cases with extreme low (“negative”) and high (“positive”) factor scores were imaged (see e.g., FIG. 3). Spearman correlations showed 5 factors correlated with birth weight, 3 of which were also correlated with gestational age. Four additional factors were correlated with placental weight but were not correlated with gestational age. One of these was correlated with birth weight. Generally, birth weight, gestational age, and placental weight are highly correlated. That the selected factors discriminate among these outcomes supports the efficicacy of the approaches described herein.

TABLE 3 Table of correlations of factor scores with birthweight, gestational age and placental weight. Birth weight Gestational age Placental weight Factor 1 R .013 .087 −.084 P value NS NS NS Factor 2 R .217(**) .148(*) .034 P value .001 .020 .600 Factor 3 R .318(**) .153(*) −.048 P value .000 .016 .458 Factor 4 R −.003 −.007 .026 P value NS NS NS Factor 5 R .018 −.053 .137(*) P value NS NS .030 Factor 6 R −.082 −.115 .086 P value NS .072 NS Factor 7 R −.165(**) −.083 .050 P value .009 NS NS Factor 8 R −.167(**) −.136(*) −.118 P value .009 .033 .065 Factor 9 R .044 .008 −.011 P value NS NS NS Factor 10 R .028 .022 .121 P value NS NS .059 Factor 11 R .098 .140(*) −.074 P value NS .028 NS Factor 12 R −.003 .088 −.188(**) P value NS NS .003 Factor 13 R .138(*) .064 .232(**) P value .030 .314 .000 Factor 14 R .117 .040 −.124 P value .066 NS .052 Factor 15 R .034 −.068 .131(*) P value NS NS .040 Factor 16 R .079 .083 −.052 P value NS NS NS (**)Correlation is significant at the 0.01 level (2-tailed). (*)Correlation is significant at the 0.05 level (2-tailed).

Given the data above, histologically, factors appear to mark visually distinct patterns of villous sizes, stromal composition, trophoblast features, and capillary architecture. Therefore, Automated slide analysis of villous branching patterns is feasible and may open a new avenue of placental analysis.

Example 6 Macroscopic Placental Measurement Tool

A random sample of 50 Kodachrome slides was obtained from Avon Longitudinal Study of Parents and Children (ALSPAC) and digitized using a computer linked Canon Canoscan FS2710. Images suitable for the graphical analysis methods were selected by a placental pathologist and epidemiologist.

A set of Excel-based macros were developed that capture and organize the mouse-clicks of a Kurta Graphics tablet. From digitized photographs of the placental chorionic surface, the umbilical cord insertion, the disk perimeter and terminal points of chorionic plate vasculature were marked (see e. g., FIG. 7). A second macro captured placental chorionic vasculature stereologically with a spiral grid of pitched at 1 cm intervals with the origin centered at the umbilical cord insertion. At each intersection of a placental chorionic vessel with the spiral, the sides of the vessel were marked, from which vessel numbers and calibers were calculated at distances from the umbilical cord insertion. A third macro traced the outlines of placental disk slices. The placenta was sliced in 8ths, creating 7 unique surfaces from which placental volume can be estimated without bias following Cavalieri's method. The macro also calculated mean and standard deviation of thickness, and minima and maxima relative to the cord insertion site and margins.

Standard regression analysis of placental chorionic surface characteristics was performed. The simple perimeter of the placental chorionic surface, oriented to cord insertion and disk edge closest to the site of membrane ruptured captured as much birth weight variance as placental weight. Novel measures accounted for more than twice the birth weight variance of current pathology standard measures (a single pair of diameters, and a single measure of disk thickness (c.f., Salafia et al, Am J Epidemiol 2005)).

Example 7 Factor Analysis

Thirty variables were successfully quantified for each of three different classes of villi defined by their cross sectional area; one variable quantified the area of fibrin in the slide.

A principal components analysis was used for data reduction. 16 factors were identified that had eigen values >1, and accounted for 89% of the total data variance.

Data were categorized as preterm v. term. Four factors were significantly different (see e.g., FIG. 9).

Preterm cases were categorized as having chorioamnionitis (a recognized cause of preterm birth birth) and not having chorioamnionitis. The latter, “idiopathic preterm birth”, is believed to result from chronic intrauterine pathology. However, since villous branching patterns are impossible to reliably quantify by expert pathologists, this has been debated. Four factors distinguished villous patterns between these two types of preterm birth (the single largest cause of infant morbidity and mortality in the US and in the world) (see e.g., FIG. 10). This is the first demonstration of distinct villous growth patterns in these two distinct types of preterm birth.

Finally, Spearman's correlations were performed to assess associations among factors scores and birth weight, gestational age and placental weight (see e.g., Table 4). While these three features are highly intercorrelated, factor scores differentiated among them, with only 3 factors associated with all three outcomes, and 9 other factors associated with one or two of the outcomes but not a third. Notably, factor 1, which accounted for ˜40% of data variance, was not associated with any of the outcomes. Without wishing to be bound to a single theory, it is speculated that this factor reflects some basic common structure in placental villi that is common to placentas, and not variable by birth weight, gestational age or placental weight.

TABLE 4 Spearman's correlations for associations among factors scores and birth weight, gestational age and placental weight. Pla- Birth Gestational cental weight age weight Factor score 1 Correlation Coefficient .014 .010 −.088 Sig. (2-tailed) .794 .855 .170 Factor score 3 Correlation Coefficient .465 .312 −.035 Sig. (2-tailed) .000 .000 .585 Factor score 4 Correlation Coefficient −.129 −.104 .054 Sig. (2-tailed) .019 .052 .399 Factor score 5 Correlation Coefficient .294 .177 .015 Sig. (2-tailed) .000 .001 .815 Factor score 6 Correlation Coefficient .304 .280 .187 Sig. (2-tailed) .000 .000 .003 Factor score 7 Correlation Coefficient −.254 −.161 .035 Sig. (2-tailed) .000 .003 .590 Factor score 8 Correlation Coefficient .130 .146 .130 Sig. (2-tailed) .018 .006 .042 Factor score 10 Correlation Coefficient .002 −.064 .193 Sig. (2-tailed) .972 .230 .002 Factor score 11 Correlation Coefficient .109 .144 −.050 Sig. (2-tailed) .047 .007 .432 Factor score 12 Correlation Coefficient .128 .126 .232 Sig. (2-tailed) .019 .019 .000 Factor score 13 Correlation Coefficient .113 .202 −.131 Sig. (2-tailed) .039 .000 .040 Factor score 14 Correlation Coefficient .044 .022 .130 Sig. (2-tailed) .421 .686 .041 Factor score 15 Correlation Coefficient .031 −.049 −.148 Sig. (2-tailed) .567 .365 .020

Example 8 Testing Predictive Value for Abnormal Childhood Somatic Development

No comparable placental measures have been calculated previously in any of the national and international birth cohorts that have childhood follow-up. However, crude measures of the placental disk (a pair of placental chorionic disk diameters and one measure of disk thickness) were collected in the National Collaborative Perinatal Project (NCPP, recruited 1959-1966, see reprint Salafia et al, 2006 in review). Extracted was the first singleton liveborn of each family in the NCPP delivered at ≧34 gestational weeks (N=15,399). Body mass index (BMI) and IQ at age 7 years were regressed against z-scored placental weight, birth weight and estimated placental chorionic surface area (calculated from the larger and smaller placental disk diameters) and disk thickness. Placental chorionic surface area and disk thickness were independently associated with BMI and IQ at age 7 years after adjustment for birth and placental weights. These standard placental measures are not only crude but they more poorly measure more unusually shaped (and more poorly grown) placentas than more normal round, oval and uniformly thick placentas. Despite limitations, the above analysis demonstrates effects on both bodily growth and IQ at age 7 and supports the approach of using comprehensive placental measures to yield useful predictions of childhood health risks.

-   Regression -   Dependent Variable: Zscore Age 7 IQ -   Predictors: Chronological age at the time of IQ test, Zscore     chorionic plate area, Zscore placental thickness (0.1 cms), Zscore     cord length (cms), Zscore birthweight, gms

Model Summary Adjusted R Std. Error of Model R R Square Square the Estimate 1 .250 .063 .062 .97170116 ANOVA Sum of Mean Model Squares df Square F Sig. 1 Regression 1952.285 5 390.457 413.531 .000(a) Residual 29283.517 31014 .944 Total 31235.802 31019 Coefficients Un- standardized Coefficients Model B Error t Sig. 1 (Constant) .791 .058 13.751 .000 Zscore birthweight, gms .076 .006 11.853 .000 Zscore cord length (cms) .134 .006 23.194 .000 Chronological age at time of test −.002 .000 −12.977 .000 Zscore placental thickness .118 .006 20.466 .000 (.1 cms) Zscore chorionic plate area .043 .006 6.916 .000

-   Regression -   Dependent Variable: Body Mass Index (BMI) at age 7 years -   Predictors: (Constant), Zscore Placental thickness, Zscore Chorionic     plate area, Zscore length of cord (cms), Zscore birthweight (gms),     Zscore placental weight (gms)

Model Summary Adjusted R Std. Error of Model R R Square Square the Estimate 1 .195 .038 .038 1.81252 ANOVA Sum of Mean Model Squares df Square F Sig. 1 Regression 2000.113 5 400.023 121.8 .000 Residual 50569.281 15393 3.285 Total 52569.394 15398 Coefficients Coefficients Std. Model B Error t Sig. 1 (Constant) 15.965 .015 1093.013 .000 Zscore placental weight .055 .022 2.511 .012 (gms) Zscore length of cord (cms) .074 .015 4.898 .000 Zscore birthweight (gms) .242 .019 12.946 .000 Zscore Chorionic plate area .059 .019 3.157 .002 Zscore Placental thickness .068 .016 4.184 .000

-   Dependent Variable: Zscore: Age 7 IQ. -   Predictors: Chronological age at the time of IQ test, Zscore     gestational age at delivery in weeks, Zscore birthweight, gms, log     transformed score for fetal inflammatory response in umbilical cord,     log transformed score for maternal inflammatory response in     extraplacental membranes and chorionic plate

Model Summary Adjusted R Std. Error of Model R R Square Square the Estimate 1 .185(a) .034 .034 .98736564 ANOVA Sum of Mean Model Squares df Square F Sig. 1 Regression 960.896 5 192.179 197.129 .000 Residual 27224.804 27926 .975 Total 28185.700 27931 Coefficients Coefficients Std. Model B Error t Sig. 1 (Constant) .782 .061 12.765 .000 Zscore birthweight, gms .142 .006 22.451 .000 Chronological age at time of test −.002 .000 −11.847 .000 Zscore: gestational age at .025 .006 3.865 .000 delivery, weeks log transformed score for fetal .240 .020 12.182 .000 inflammatory response in umbilical cord log transformed score for −.152 .014 −10.629 .000 maternal inflammatory response in extraplacental membranes and chorionic plate

-   Dependent Variable: Zscore: Age 7 IQ; Predictors: Chronological age     at the time of IQ test, Zscore gestational age at delivery in weeks,     Zscore birthweight, gms, log transformed score for infarct/abruption

Model Summary Adjusted R Std. Error of Model R R Square Square the Estimate 1 .183 .033 .033 .98683026 ANOVA Sum of Mean Model Squares df Square F Sig. 1 Regression 1039.565 4 259.891 266.874 .000(a) Residual 30072.967 30881 .974 Total 31112.531 30885 Coefficients Unstandardized Coefficients Std. Model B Error t Sig. 1 (Constant) .697 .059 11.896 .000 Zscore: birthweight, gms .145 .006 24.235 .000 Chronological age at time test −.002 .000 −11.800 .000 Zscore: gestation at delivery, .025 .006 4.140 .000 weeks log transformed score for .108 .008 13.578 .000 infarct/abruption

Example 9 Refinement

The data set is a 1,000 case subset of the Avon Longitudinal Study of Parents and Children (ALSPAC), an internationally recognized longitudinal study of children's health. The data set has been used to help understand the contribution of genetic factors, antenatal risk factors, peripartum conditions to perinatal and/or childhood outcomes. 14,000 placentas were collected and stored. The analytic sample used, and to be used, according to methods described herein include 1000 cases with placental photographs and a minimum of 7 tissue samples processed into wax blocks and H&E slides.

Macroscopic

For macroscopic placental analysis, ALSPAC placental photographs, initially preserved as Kodachrome slides, are scanned using the Canon Canoscan FS2710 attached to a PC using Windows and stored as jpgs. Data are extracted from digitized images of placental chorionic surface and disk slices (see Example 3).

Additional data and orientation points are incorporated into the placental chorionic surface analyses (e.g., chorionic vascular branching and vessel calibers). As described above, the macros for chorionic vascular branching measurement have <5% inter-rater variability. Patterns of chorionic surface branching correlate with patterned villous branching in microscopic slides, and they combine to provide a measure that predicts the long term health of other organs that undergo contemporaneous (in utero) branching development. FIG. 8 shows an example of the tracing of chorionic vessel branching.

Disk thickness measures are incorporated into a single 3-dimensional macroscopic placental structural measurement model. Likewise, measurements of disk thickness (also with 5% inter-rater variability) that better capture its variability improve the ability to characterize placental structure. Moreover, differences in disk thickness may correlate with specific changes in microscopic patterned villous branching. Macroscopic and microscopic placental structural measures are likely to converge to identify abnormally stressful intrauterine environments. Data reductions by EFA/CFA and CN are compared, as for the microscopic tool.

Also, placental three-dimensional shapes are mathematically characterized, in terms of both chorionic plate area and disk thickness, as resulting from a single “disturbance” (or a “single hit”) and those with shapes that would require multiple “disturbances” (“multiple hits”), a recognized antecedent to poor outcome. Shapes are also analyzed in terms of the relative severity of “disturbances” required to generate achieved placental shapes. Because early (peri-implantation) placentas are thought to have a basic shape (discoid, centered about the umbilical cord insertion), abnormal shapes that result from maternal uteroplacental stressors or “disturbances” that deform normal uniform centripetal expansion are better able to be characterized.

Microscopic

For microscopic placental analysis, H&E slides from ALSPAC are digitized using an Aperio T3 instrument. Described above is a set of “model objects”, the basic elements of the network language.

Example 10 Expanded Algorithms for Histology Items

The set of model objects are added to by including other histology features (e.g., characteristics of villous stroma, characteristics of placental vessel media) that distinguish among villous types and refine objects. Data set and macroscopic and microscopic methods are as described earlier. Additional histology features that are defined as a result of that refinement yield a large number of variables that can be expressed as raw values (e.g., villous cross sectional area) or in relative terms (e.g., capillary number per villous cross sectional area, syncytial knots per villi, etc.) Once verified, items are subjected to data reduction (EFA/CFA). Individual histology items and extracted factors are also tested for inclusion within a CN framework.

Histology Item and Network Verification

Verification is made that automatically generated histology items quantities accurately measure the tissue features, and that CN parameters accurately reflect distinctive histopathology types.

For quantitative immunostaining, automatically generated quantities of trophoblast, endothelial and stromal areas are compared against immunostained serial sections marking specific villous compartments (trophoblast via cytokeratin 8, endothelium via CD-31, and villous stroma via vimentin).

For immunostaning methods, placental tissue samples are fixed in 10% buffered formalin solution for 24 hours, transferred to 70% ethanol and dehydrated. The tissues are embedded in paraffin, and the blocks cut into 5 μm thick serial sections that are placed on charged slides, deparaffinized and rinsed. Target Retrieval Solution (DAKO) is used to optimize antigen binding. Immunostaining methods otherwise involve standard double-labeling developed with AEC chromogen to reveal the reaction product (a reddish deposit). The stained slides are digitized as above.

Quantitative Immunostained Image Analysis

For quantitative immunostained image analysis, an “Intensity Score” algorithm (Aperio Technologies, Vista, Calif.), a general-purpose method for quantitating immunostained slides, were set to detect the appropriate chromogen and counterstains. The algorithm segments the stained image pixels into categories (negative, weak positive, positive, and strong positive) according to intensity thresholds that can be adjusted by the pathologist, and calculates the total stained area (mm²) and the percentages of that area belonging to each category. For all slides, three regions with different anatomy and histology, and gene expression are specified: the subchorionic, the basal, and the central regions of the chorionic disk. The percent area of immunostaining is measured for each type of immunostained preparation (CD-31, cytokeratin 8 and vimentin), and extracted. This method has been used successfully to quantitate villous endothelial % area in placentas containing different levels of arsenic. As a second quality assurance check, slides with values in the upper quartile have independent review of the markup image to visually confirm algorithm accuracy. These checks allow detection of outliers due to technical variability making these variables robust. H&E and immunostained quantified areas are compared and H&E algorithms refined until variance is <5%.

Pathologist Review

The algorithm assessments are compared against expert pathologist's histology feature scoring. While villous branching patterns are not reliably diagnosed by pathologist' review, many histology items are quantified by Ecognition algorithms (e.g., numbers of syncytial knots, changes in villous calibers or “distal villous hypoplasia) and scorings are thus compared. Various approaches, such as a histology item dictionary of photo-micrographs, a learning set of slides, and periodic centering and standard conditions of slide review improve scoring reliability. Histology items are scored according to their template based on previous publications and villous branching patterns are categorized in preparation for developing a CN that organizes the histology items according to the standard understanding of villous arborized structure. Algorithm classification and automated histology item quantitative measures are compared against pathologists' classifications and semiquantitative histology item scores. Algorithm-pathologist discrepancies are resolved by standard morphometric analysis of 40 random slide fields, and 15 fields selected to justify pathologist classification. Standard quantitative morphometry and pathologists' assessment are reviewed and the algorithm revised. Iterative revision ceases when classification kappa is >0.80, and CN and standard morphometry quantities have <10% variance.

Data Reduction by EFA/CFA

For EFA/CFA data reduction, the distributions of the macroscopic and microscopic item values or variables are reviewed with histograms and box plots to identify key distributional features (such as skewness or outliers) that might impact on the performance of inferential methods. ANOVA tests for significant differences in distributions of histology items across gestational age categories (preterm v. term) and maternal diseases and exposures (e.g., diabetes, preeclampsia, smoking). Nonlinearities, multicolinearity and intercorrelations are evaluated with cross tabulation and plots of bivariate relationships. Data transformation develops linear functions of associations between placental measurement items. In one random split half, EFA extracts latent variables that capture important facets of placental arborized structure. Alternate factor structures are compared using robust fit criteria. CFA tests the factor structures in the second random split half including assessment of potentially relevant obstetric mediators, effect modifiers, and/or confounders. Reliability of histology items and extracted factors are assessed using test-retest and alternate forms methods. Data Reduction by Cognition Networks

The villous and histology item objects are organized into a “cognition network” that incorporates Kaufmann's model of the normal relationships among the levels of branches of the placental villous tree. This network describes the “semantic meaning” of objects in the network. Different villous types have different physiological roles (terminal villi as sites of nutrient and oxygen exchange, stem villi as sites of placental vascular resistance) and are laid down, like tree branches, at different times in pregnancy.

Within the total image, villi generated at different times in pregnancy, with different anatomic and physiologic attributes, are analyzed not only as individual objects (present status of algorithms) but also within their “neighborhood” context, in relation to their neighboring villi, also assigned specific anatomic and physiologic attributes. The objects within their neighborhoods are analyzed in terms of the normal hierarchy of arborization of the placental villous tree, from the surface placental chorionic vascular branches to the distal terminal villi. As an illustrative metaphor, these algorithms provide outputs that distinguish, for example, the branching structure of a maple tree from that of a willow tree. With over 7500 slides available in the ALSPAC sample, abundant resources are available to refine classification algorithms. As noted, extracted factors are also tested for inclusion in the CN, for the sake of model parsimony. The “manual” for the resulting tool is the algorithm sets that define the histology items and that place them within their “neighborhood” context. Thus, the tool can be applied to any digitalized slide set. An archive of slides from placentas of persons currently aged 45-55 years, and other data sets, is used to confirm generalizability of the approach, and to refine algorithms where needed to achieve that generalizability.

Example 11 Choronic Vascular “Fit”, Cord Centrality, and Fetal Growth Restriction

The experiments described herein demonstrate that poor “fit” of the chorionic vessels to the chorionic plate area and asymmetric growth of vessels from the cord insertion are correlated with reduced fetal growth.

314 consecutive consenting mothers delivering singleton live-born infants had placentas collected, and digitally photographed and weighed. The perimeter of the chorionic disk was traced; cord insertion and the sites at which each chorionic vessel dived beneath the chorionic plate were marked (see e.g., FIG. 7). More specifically, a print of the photograph was placed on a Kurta Graphics tablet, overlaid with a transparent 1 cm grid. X,y coordinates were captured at each intersection of the perimeter with the grid, and additionally at any points of inflection. Then a second set of mouse clicks marked the end points of all chorionic plate surface vessels. The two shapes were interpolated. The area and perimeter demarcated by the diving sites was calculated. An algorithm calculated areas, and the centroid, the weighted center of the area. The chorionic plate and the chorionic vascular area were essentially treated as a pair of shapes that should “fit”. “Fit” is reflected in the distance between centroids. Dimensionless ratios of chorionic vascular area/perimeter and chorionic disk area/perimeter, distance between centroids of the inner and outer areas (inter-centroid distance), and distance from cord insertion to the disk area centroid (FIG. 11) were analyzed with regression, with p<0.05 significant. Observed/expected birthweight ratio (O/E BW) was calculated from national 50th centile standards adjusting for gestational age, race, gender and parity.

Results showed that each measure was associated with O/E BW (ρarea=0.17, ρperimeter=0.18, ρinter-centroid=−0.18, ρcord-centroid=−0.14) (see Table 6). Reduced area and perimeter ratios as well as greater inter-centroid distance (P<0.004) were related to reduced placental weight. In multiple regression, intercentroid and cord-centroid distances) retained independent effects on O/E BW (p=0.015, p=0.04). In a multivariate regression, the novel ratio measures accounted for 17% of O/E BW variance (r=0.44). Only intercentroid distance affected O/E BW independent of adjusted placental weight.

Area and perimeter ratios were normally distributed; inter-centroid and cord-centroid distances were skewed (see e.g., FIG. 12C). Each was transformed and tested in univariate and multivariate regression. Only the intercentroid distance (“inintercent”) affected O/E BW ratio independent of placental weight (see Table 7).

Chattanooga babies tended to be slightly smaller than expected (mean=0.98) (see e.g., FIG. 12A). Chattanooga placentas tended to be slightly larger than expected (mean=1.02) (see e.g., FIG. 12B).

TABLE 5 Distributions of Novel Chorionic Disk Measures and Ratios. This data set was a consecutively collected series of singleton placentas of liveborn, non-anomalous infants born at Erlanger Hospital, Chattanooga, TN, July-August 2005. The series was collected to explore environmental contributions to a LBW epidemic that has led to county-wide LBW rates of 14+%. LBW rates were 17% in samples herein, with PTD rates of 11%. Min Max Mean SD Chorionic plate 0.08 435.69 257.89 60.58 area Chorionic plate 0.05 306.92 162.05 49.51 perimeter Chorionic plate 0.53 0.99 0.93 0.06 compactness Chorionic plate 24.34 119.55 41.74 9.46 standard deviation Distance between 0.01 3.34 0.56 0.38 chorionic vascular and chorionic plate centroids Distance between 0 0.2 0.04 0.03 chorionic vascular and chorionic plate centroids, normalized for scaling Distance from cord 0.04 17.82 3.61 2.29 insertion point to outer centroid Distance between 0.01 1.09 0.23 0.15 cord insertion point and outer centroid, normalized for scaling Ratio of chorionic 0.33 0.93 0.65 0.09 vascular and chorionic plate areas Ratio of chorionic 0.13 16.6 0.37 0.93 vascular area to chorionic vascular perimeter (“ruffling”) Ratio of chorionic 0.88 3.23 1.65 0.29 plate area to chorionic plate perimeter (“ruffling”) Placental weight 248.84 920.83 465.56 104.1 adjusted for gestational age Birth weight 1783.4 5896.4 3052.4 474.4 adjusted for gestational age Observed/expected 0.47 2.58 1.02 0.25 placental weight ratio Observed/expected 0.55 1.61 0.98 0.15 birth weight ratio

TABLE 6 Regression: Dependent- Observed/Expected Birth weight ratio

TABLE 7 Regression: Dependent- O/E BW ratio, Ln transformed predictors

Thus, variations in O/E BW for a given placental weight can be explained, at least in part, by subtle alterations in the relationships among placental parameters (e.g., cord insertion, chorionic vessel growth and chorionic disk expansion). Asymmetric growth of chorionic vasculature relative to the underlying chorionic disk results in a relatively inefficient placenta that produces a smaller-than-expected infant.

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1. A method of analyzing the placenta and histology slides of placental tissue comprising: selecting a placental sample to be analyzed; obtaining a digital image of the placental sample; and performing an analysis on the digital image, wherein a mathematical algorithm is applied to the digital image.
 2. The method of claim 1 wherein the mathematical algorithms are selected from the group consisting of spatial fuzzy c-means algorithms, segmentation algorithms, boundary finding algorithms, counting algorithms, length measuring algorithms, branching algorithms, angle measuring algorithms, and color discriminating algorithms.
 3. The method of claim 1 wherein the digital image may be obtained from either the gross placental shape or from histology slides.
 4. The method of claim 1 wherein the mathematical algorithm operates on at least one histological parameter selected the group consisting of neutrophil count, blood vessel area maximum, blood vessel area mean, blood vessel area minimum, branched villi area maximum, branched villi area mean, branched villi area minimum, large villi area maximum, large villi area mean, large villi area minimum, long villi area maximum, long villi area mean, long villi area minimum, nutrition exchange vessel area maximum, nutrition exchange vessel area mean, nutrition exchange vessel area minimum, small villi area maximum, small villi area mean, small villi area minimum, capillary at border area maximum, capillary at border area mean, and capillary at border area minimum.
 5. The method of claim 1 wherein the process of performing the analysis of the digital image and the application of the mathematical algorithms is automated.
 6. The method of claim 1 wherein the results of the mathematical algorithm are correlated with data on health outcomes in infants, children, or adults.
 7. The method of claim 1 wherein the results of the mathematical algorithm are used to assess future physiological risks to a patient.
 8. A method of analyzing a placental branch structure comprising: selecting a set of placental standards, selecting a placental sample to be analyzed, running a cognitive network analysis on the placental sample, wherein the analysis produces factors, and correlating sample factors with factors produced from analysis of the placental standards.
 9. The method of claim 8 wherein the factors are derived from at least one histological parameter selected the group consisting of blood vessel area maximum, blood vessel area mean, blood vessel area minimum, branched villi area maximum, branched villi area mean, branched villi area minimum, large villi area maximum, large villi area mean, large villi area minimum, long villi area maximum, long villi area mean, long villi area minimum, nutrition exchange vessel area maximum, nutrition exchange vessel area mean, nutrition exchange vessel area minimum, small villi area maximum, small villi area mean, small villi area minimum, capillary at border area maximum, capillary at border area mean, and capillary at border area minimum.
 10. The method of claim 8 wherein the results of the comparison are used to assess future physiological risks to a patient. 